J. Phys. Chem. A 2008, 112, 10435
10435
COMMENTS Comment on “Local Lattice Structure Study of the Octahedral (CrO6)9- Clusters for Cr3+ Ion Doping in a Variety of Oxide Crystals by Simulating the Corresponding EPR and Optical Spectra” J. M. Garcı´a-Lastra,†,‡ M. T. Barriuso,§ J. A. Aramburu,*,† and M. Moreno† Departamento de Ciencias de la Tierra y Fı´sica de la Materia Condensada, UniVersidad de Cantabria, AVda. de los Castros s/n, 39005 Santander, Spain, Departamento de Fı´sica de Materiales, Facultad de Quı´micas, UniVersidad del Paı´s Vasco, 20018 San Sebastia´n, Spain, and Departamento de Fı´sica Moderna, UniVersidad de Cantabria, AVda. de los Castros s/n, 39005 Santander, Spain ReceiVed: July 17, 2008; ReVised Manuscript ReceiVed: August 18, 2008 The microscopic origin of optical and magnetic properties displayed by Cr3+ impurities in oxide lattices is a subject of current interest as it plays a key role for understanding the color exhibited by gemstones like ruby (Al2O3:Cr3+), emerald (Be3Si6Al2O18:Cr3+) or alexandrite (BeAl2O4:Cr3+). In a recent paper Kuang et al. claim1 that reasonable values of the mean equilibrium Cr3+-O2- distance, R (and also of the small distortion undergone by the oxygen octahedron), can be obtained from an analysis of experimental values of optical transitions and EPR parameters through a parametrized crystal-field model. In essence such an analysis is founded on two main assumptions: (1) Electronic properties due to Cr3+ impurities in oxides can be understood considering only the CrO69- complex at the right equilibrium geometry. (2) Accordingly, changes in the cubic field splitting parameter, 10 Dq, reflect necessarily variations of R following the law 10 Dq ) KR-n, where K is a constant and the exponent n would be close to 5. As the color of insulating oxides doped with Cr3+ essentially depends on the energy of the first spin allowed 4A2g (t2g3) f 4T 2 2 2g (t2g eg) transition, which is just equal to 10 Dq, such assumptions mean that a change in color implies a variation of the average equilibrium Cr3+-O2- distance. By virtue of this fact in the analysis carried out by Kuang et al. the experimental 10 Dq values measured for emerald (16130 cm-1) and ruby (18070 cm-1) are explained by stating1 that mean equilibrium Cr3+-O2- distances are R ) 202 and 195.4 pm for emerald and ruby, respectively. However, this conclusion is against experimental EXAFS data,3-5 which unambiguously prove that emerald and ruby have the same R value (equal to 197 pm) within the experimental uncertainty (1 pm). Along this line a † Departamento de Ciencias de la Tierra y Fı´sica de la Materia Condensada, Universidad de Cantabria. ‡ Universidad del Paı´s Vasco. § Departamento de Fı´sica Moderna, Universidad de Cantabria.
nearly equal value R ) 198 ( 1 pm has recently been measured6 for the spinel MgAl2O4:Cr3+. It is certainly surprising that these relevant experimental facts are not taken into consideration in the paper1 by Kuang et al. In fact, information on the actual R values for ruby and emerald is given in refs 3 and 7, which are also quoted in the paper1 by Kuang et al. From a fundamental point of view the wrong conclusion reached by Kuang et al. is thus not different from that reached by Orgel 50 years ago.8 This author already showed that, in the framework of the traditional ligand field theory, the different color displayed by ruby and emerald can only be explained by assuming that R(emerald) - R(ruby) should be around 5 pm. It has recently been shown that this failure of the traditional ligand field theory obeys the fact that properties of a transition metal impurity, M, in an insulating lattice are assumed to be explained only through the MXN complex (formed with the N ligands) in vacuo.7,9 However, although active electrons are usually confined in the complex region they are also subject to the internal electric field, ER, due to all ions of the insulating host lattice lying outside the complex. Accordingly, 10 Dq also depends on the shape of ER in the complex region and not only on the actual R value. Interestingly, the effects of the internal electric field, ER, have been shown to be not necessarily negligible even if the host lattice is cubic.9 In the case of Cr3+ impurities in oxides the validity of this idea has been proved7,10 through ab initio calculations carried out on a CrO69- complex at the right equilibrium geometry and subject to the corresponding ER field. The shape of this internal field in the complex region is strongly dependent on the type of host lattice. By means of this procedure (where no parameters are employed) the different color exhibited by ruby, emerald and the two centers formed in the alexandrite has been explained in a reasonable way,7,10 thus without invoking different R values for ruby and emerald, a fact not consistent with recent experimental findings.3-5 References and Notes (1) Kuang, X. Y.; Mao, A. J.; Wang, H. J. Phys. Chem. A 2008, 112, 737. (2) Burns, R. G. Mineralogical applications of crystal field theory; Cambridge University Press: Cambridge, U.K., 1993. (3) Gaudry, E.; Kiratisin, A.; Sainctavit, P.; Brouder, C.; Mauri, F.; Ramos, A.; Rogalev, A.; Goulon, J. Phys. ReV. B 2003, 67, 094108. (4) Gaudry, E. The`se d′E´tat. Universite´ Paris VI, 2004. (5) Gaudry, E.; Cabaret, D.; Brouder, C.; Letard, I.; Rogalev, A.; Wilhlem, F.; Jaouen, N.; Sainctavit, P. Phys. ReV. B 2007, 76, 094110. (6) Juhin, A.; Calas, G.; Cabaret, D.; Galoisy, J.; Hazemann, J. L. Phys. ReV. B 2007, 76, 054105. (7) Garcia-Lastra, J. M.; Aramburu, J. A.; Barriuso, M. T.; Moreno, M. Phys. ReV. B 2006, 74, 115118. (8) Orgel, L. E. Nature 1957, 179, 1348. (9) Garcia-Lastra, J. M.; Buzare, J. Y.; Barriuso, M. T.; Aramburu, J. A.; Moreno, M. Phys. ReV. B 2007, 75, 155101. (10) Garcia-Lastra, J. M.; Aramburu, J. A.; Barriuso, M. T.; Moreno, M. Phys. ReV. B 2005, 72, 113104.
JP806313S
10.1021/jp806313s CCC: $40.75 2008 American Chemical Society Published on Web 09/25/2008